div class=ts-pagebuttonPage 1button div class=ts-image amp-img class=ts-thumb alt=Page 1: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails1jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 2button div class=ts-image amp-img class=ts-thumb alt=Page 2: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails2jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 3button div class=ts-image amp-img class=ts-thumb alt=Page 3: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails3jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 4button div class=ts-image amp-img class=ts-thumb alt=Page 4: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails4jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 5button div class=ts-image amp-img class=ts-thumb alt=Page 5: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails5jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 6button div class=ts-image amp-img class=ts-thumb alt=Page 6: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails6jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 7button div class=ts-image amp-img class=ts-thumb alt=Page 7: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails7jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 8button div class=ts-image amp-img class=ts-thumb alt=Page 8: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails8jpg width=142 height=106 layout=responsive amp-img divdivdiv class=ts-pagebuttonPage 9button div class=ts-image amp-img class=ts-thumb alt=Page 9: Dalhousie University · To obtain the Rogers-Ramanujan identities we first q-deform 1 as follows again a — qj2+aj n T j Note that these formulas are expresse polynomials src=https:reader034vdocumentsnetreader034viewer20220506125fb316b6ae77b259166e0134html5thumbnails9jpg width=142 height=106 layout=responsive amp-img divdiv